Bilinear embedding for divergence-form operators with first-order terms and negative potentials

TL;DR

This paper develops a bilinear embedding for complex divergence-form operators with first-order terms and negative potentials, extending previous theories and providing new tools for analysis.

Contribution

It introduces a unified notion of generalized p-ellipticity and a novel sequence-based approach to handle complex operators in arbitrary open sets.

Findings

Proves boundedness of the $H^ abla$-calculus on $L^p$.

Establishes $L^p$-maximal regularity for the operators.

Provides conditions for $L^p$-contractivity and $L^p$-analyticity of the semigroup.

Abstract

This article establishes a bilinear embedding for second-order divergence-form operators with complex coefficients, characterized by the simultaneous presence of first-order terms and negative potentials. This work provides a further development of the theory initiated by Carbonaro and Dragi\v{c}evi\'c for the homogeneous case, and recently extended by the second author to cases where first-order terms or negative potentials were treated in isolation. We work in the general setting of arbitrary open subsets of $\mathbb{R}^d$ under Dirichlet, Neumann, or mixed boundary conditions. Our main contribution is the introduction of a unified notion of generalized $p$-ellipticity that extends all its predecessors and serves as the natural condition for the bilinear inequality. Methodologically, we overcome the rigidity of the Bellman-heat method on arbitrary open subsets by introducing a novel sequence-based approach that unifies and simplifies the previous techniques. As fundamental applications, we prove the boundedness of the $H^\infty$-calculus on $L^p$ and establish $L^p$-maximal regularity. Moreover, we show that this generalized $p$-ellipticity provides a sufficient condition for the $L^p$-contractivity and $L^p$-analyticity of the generated semigroup.